Harmonic moments and an inverse problem for the heat equation

In the paper, we study an inverse problem for the heat equation. We introduce a class of bilinear forms on the space of harmonic polynomials ( called harmonic moments), which are represented by the Dirichlet-to-Neumann map. We investigate the uniqueness, stability, and reconstruction of the inverse...

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Bibliographic Details

Main Authors:	M. Kawashita, Y.V. Kurylev, H. Soga
Format:	Default Preprint
Published:	1999
Subjects:	Other mathematical sciences not elsewhere classified untagged Mathematical Sciences not elsewhere classified
Online Access:	https://hdl.handle.net/2134/846
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